本書(shū)是一部分析學(xué)經(jīng)典專著,以作者的*研究為藍(lán)本,證明基于兩方面:基態(tài)的變分結(jié)構(gòu)和這些態(tài)附近的非線性雙曲動(dòng)力學(xué),這兩方面的交互作用。本書(shū)適于為數(shù)學(xué)專業(yè)和物理專業(yè)的研究生和科研人員。書(shū)中詳盡地呈現(xiàn)了三維中的Klein-Gordon三次方程,包括自由方程的Strichartz估計(jì)推導(dǎo),和集中緊性爭(zhēng)論導(dǎo)致的散射。
目次:基態(tài)能量以下的Klein-Gordon方程;基態(tài)能量Ⅰ之上,臨近Q;基態(tài)能量Ⅱ之上,遠(yuǎn)離Q;基態(tài)能量Ⅲ之上:全局NLKG動(dòng)力;該理論的更深研究。
讀者對(duì)象:本書(shū)適用于偏微分方程和數(shù)學(xué)物理方向的研究生和科研人員。
《不變流形和色散型哈密頓發(fā)展方程(英文)》由世界圖書(shū)出版公司北京公司出版。
Kenji Nakanishi(中西健二,日本)是國(guó)際知名學(xué)者,在數(shù)學(xué)和物理學(xué)界享有盛譽(yù)。本書(shū)凝聚了作者多年科研和教學(xué)成果,適用于科研工作者、高校教師和研究生。
Introduction
2 The Klein—Gordon equation below the ground state energy
2.1 Basic existence theory
2.2 Stationary solutions, ground state
2.3 The Payne—Sattinger criterion, regions □S±
2.4 Scattering in □S+
2.5 Strichartz estimates for Klein—Gordon equations
2.6 Summary and conclusion
3 Above the ground state energy Ⅰ: Near Q
3.1 Energy landscape
3.2 Center, stable, and unstable manifolds in hyperbolic dynamics
3.3 Center—stable manifolds via the Lyapunov—Perron method
3.4 Dispersive estimates for the perturbed linear evolution
3.5 The center—stable manifold for the radial cubic NLS in R3
3.6 Summary and conclusion
4 Above the ground state energy Ⅱ: Moving away from Q
4.1 Nonlinear distance function, eigenmode dominance, ejection
4.2 J and Ko, K2 above the ground state energy
4.3 The one—pass theorem
4.4 Summary and conclusion
5 Above the ground state energy Ⅲ: Global NLKG dynamics
5.1 Statement of the main results on global dynamics
5.2 The blowup/scattering dichotomy in the ejection case
5.3 Proofs of the main results
5.4 Summary and conclusion
6 Further developments of the theory
6.1 The nonradial cubic NLKG equation in R3
6.2 The one—dimensional NLKG equation
6.3 The cubic radial NLS equation in R3
6.4 The energy criticalwave equation
References
Index